flux and irradiance flux irradiance intensity radiance - … · flux and irradiance 1 ... the...
TRANSCRIPT
Basic Quantities in Illumination
Flux and Irradiance
1
In examining terminology for illumination it is useful to separate the spatial considerations from the spectral concerns In many cases the spatial and spectral issues are independent and can be separated without losing any generality In other cases the spatial and spectral issues cannot be separated physically but it is useful to separate them conceptually The commonly used spatial quantities are flux irradiance intensity and radiance Flux Φ is the optical power or rate of flow of radiant energy Irradiance E is the flux per unit area striking a surface Occasionally the flux per unit area leaving a surface called exitance M is important However the geometry is the same as for irradiance so it will not be treated separately here Furthermore when exitance is used it is often the flux leaving a nonphysical surface such as the exit port of an integrating sphere or the real image in an imaging system where it is identical to the irradiance onto the surface The irradiance quantity itself says absolutely nothing about the directionality of the flux For example if the three cases in the figure below all have the same flux per unit area striking the surface then they all have the same irradiance Because of this ambiguity specifications for illumination systems often qualify the irradiance quantity with an added description of the desired directional properties
normal collimated illumination
oblique collimated illumination
diffuse illumination
Illumination
Solid Angle
2
The definition of intensity involves the concept of a solid angle A solid angle is a 3D angular volume that is defined analogously to the definition of a plane angle in two dimensions A plane angle θ made up of the lines from two points meeting at a vertex is defined by the arc length of a circle subtended by the lines and by the radius of that circle as shown below The dimensionless unit of plane angle is the radian with 2π radians in a full circle A solid angle ω made up of all the lines from a closed curve meeting at a vertex is defined by the surface area of a sphere subtended by the lines and by the radius of that sphere as shown below The dimensionless unit of solid angle is the steradian with 4π steradians in a full sphere
ω
area a on surface of sphere
ω=ar2 (steradians) 4π steradians in a full sphere
ω
Closed curve
r
θ =lr (radians)
2π radians in
a full circle
θr
l B
O
A B
O
θ
A
Basic Quantities in Illumination
Intensity Radiance and Projected Solid Angle
3
Intensity I is the flux per unit solid angle It is the amount of flux from a point source contained in a small angular volume A source can be considered a point source for this application if the irradiance falls off as the inverse square of the distance from the source Intensity for a given source can vary with direction Radiance L applies to extended sources and surfaces It is the flux per unit solid angle per unit projected area of the source or surface The projected area is the projection of the area onto a surface normal to the direction of view and is equal to the actual area times the cosine of the angle between the surface normal and the direction of view Radiance can vary with position on a surface and like intensity it can vary with direction A source or surface with constant radiance in all directions is called Lambertian A Lambertian source or surface has intensity that varies with the cosine of the angle with the surface normal In many cases the angle of view changes over the extent of the receiver These cases require an alternate definition of radiance radiance is the flux per unit area per unit projected solid angle (In fact this is the more general definition and covers the simpler case where the entire surface of the extended source is at essentially the same angle as the direction of view)
The term ldquointensityrdquo is used in many disciplines some even closely related to optics to mean things other than flux per unit solid angle Use caution and rely on context to determine the meaning of the word in a particular situation
Illumination
Solid Angle and Projected Solid Angle
4
The relationship between solid angle and projected solid angle can be confusing Projected solid angle has meaning primarily for a small Lambertian source which has intensity that varies as the cosine of the angle with the surface normal The projected solid angle Ω is the solid angle ω weighted by the cosine of the angle with the surface normal
When the solid angle is large enough so that the angle with the surface normal is not the same over the entire solid angle the total projected solid angle must be computed by integrating the incremental projected solid angles See the reference by Bartell for a more detailed explanation For some special cases the integration results in simple expressions such as for a large circular cone that is normal to a surface and subtends a half angle θ
θ
Ω = π sin2 θ
A hemisphere has 2π steradians (solid angle) but π projected steradians (projected solid angle)
ω
ϕ Ω = ω cos ϕ
Basic Quantities in Illumination
Spectroradiometric and Radiometric Quantities
5
In the spectral dimension of illumination the most general view looks at the spectral densitymdashthe amount of radiation per unit wavelength interval In terms of the four spatial quantities already considered the spectral quantities are spectral flux Φλ spectral irradiance Eλ spectral intensity Iλ and spectral radiance Lλ These quantities usually written with a subscript to indicate that they are integrable must be integrated to determine the amount of radiation in a particular spectral band For example the total radiant flux Φ (in units of watts) in the band between wavelength λ1 and wavelength λ2 is
2
1
( 1 2) ( ) dλ
λλ
Φ λ λ = Φ λ sdot λint
Similar expressions can be written for the total irradiance E (wattsm2) total radiant intensity I (watts sr) and total radiance L (wattsm2sr) Photometry measures the response of the human eye to light Although not everyone has exactly the same response the standardized CIE 1924 luminous efficiency function works very well for most people (The CIE is the International Commission on Illumination) This function shown on the following page is designated V(λ) The values for this function in 5-nm increments are given in the Appendix Not coincidentally this function is identical to the CIE color matching function y The unit of luminous (photopic) flux is the lumen The luminous flux is found from the spectral flux and the V(λ) function from the following relationship
luminous flux 683 ( ) ( ) V dλ= Φ λ sdot λ sdot λint The factor of 683 in this equation comes directly from the definition of the fundamental unit of luminous intensity the candela
6 Illumination
Photometric Quantities
CIE 1924 Luminous Efficiency
(Vλ)
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
Notes on notation
bull The photopic quantities of flux irradiance intensity and radiance are called luminous flux illuminance luminous intensity and luminance respectively
bull These quantities are sometimes notated with a subscript ldquovrdquo (for visual) as Φv Ev Iv and Lv But often the subscript is omitted since the meaning is usually clear from the context and it could be confused with the subscript notation often reserved for integrable quantities
bull The designations Φ E I and L are common but not universally standard Another set of symbols sometimes used is P H J and N respectively for radiometric quantities Pλ H λ J λ and N λ for spectral quantities and F E I and B for the corresponding photometric quantities
bull Solid angle and projected solid angle are not always distinguished by ω and Ω respectively
Basic Quantities in Illumination
Matrix of Basic Quantities
7
The table above shows the four spatial quantities and the three spectral categories that are discussed in the preceding pages These create 12 distinct cells that cover the vast majority of specifications for illumination systems
With two exceptions both used mainly in the United States work in illumination is almost always done in SI units The two exceptions (both deprecated) are
Illuminance 1 footcandle (lmft2) = 10764 lux (lmm2)
Luminance 1 footlambert (candelaπft2) = 3426 nit (candelam2)
SPECTRAL Radio-
metric Spectral Photopic
Flux
Power
Watts (W)
Power wavelength
interval
Wattsnm
Luminous flux
Lumens (lm)
Flux area
Irradiance
Wm2
Spectral irradiance
Wm2middotnm
Illuminance
lmm2
or lux
Flux solid angle
(Radiant) intensity
Wsr
Spectral intensity
Wsrmiddotnm
(Luminous) intensity
lmsr or
candela (cd)
S P A T I A L
Flux areamiddot solid angle
Radiance
Wm2middotsr
Spectral radiance
Wm2middotsrmiddotnm
Luminance
lmm2middotsr or
cdm2 or nit
8 Illumination
Photopic and Scotopic Vision
The human visual system responds to light over a wide dynamic range in excess of 6 orders of magnitude To achieve this dynamic range the mechanisms for high-light-level vision and low-light-level vision are different The high-level region called the photopic region is active at luminance levels above about 3 cdm2 The low-level region called the scotopic region is active below approximately 001 cdm2 The region between pure photopic and pure scotopic is called the mesopic region where the visual response is a mixture of the two The photopic efficiency usually designated V(λ) peaks at 555 nm while the scotopic efficiency usually designated Vprime(λ) peaks at 507 nm
Scotopic and PhotopicLuminous Efficiency
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
The values for photopic efficiency and scotopic efficiency both in 5-nm increments are given in the Appendix
Basic Quantities in Illumination
Luminous Efficacy
9
Luminous efficacy quantified in lumens per watt is a measure of the ability of a light source to produce a visual response from its power In the photopic region luminous efficacy peaks at 683 lumens per watt at 555 nm In fact the lumen is defined in terms of the power at 555 nm (frequency of 540 times 1012 Hz) Specifically the definition (adopted in 1979) is in terms of the candela (lumen per steradian)
0
100
200 300
400 500
600 700
350 400 450 500 550 600 650 700 750 800 wavelength (nm)
Lum
inou
s Ef
ficac
y (lm
W)
Luminous Efficacy(photopic)
It is usually clear from the context whether the power is the radiated power (as in the discussion above) or often for lamps the ldquowall-plugrdquo power
The candela is the luminous intensity in a given direction of a source that emits monochromatic radiation at a frequency of 540 times 1012 Hz and that has a radiant intensity in that direction of 1683 Watt per steradian
10 Illumination
Typical Values of Illumination Quantities
Wavelength Ranges for Illumination
UV-C 250 to 280 nm UV-B 280 to 315 nm UV-A 315 to 400 nm Visible ~360ndash400 to ~760ndash800 nm Near-infrared (NIR)dagger 760 nm to 11 microm Actual definition of UV-C is 100 to 280 nm However the
range from 100 to 250 nm is not of interest for illumination systems
dagger Actual definition of NIR is to 14 microm However 11 microm is the upper limit for silicon-based detectors
Irradiance and Illuminance Direct sunlight 1000 Wm2 (250-
2500nm) Direct sunlight 100000 lux Shade 10000 lux Overcast day 1000 lux Office space 300ndash600 lux Full moon 02 lux Quarter moon 001 lux Moonless clear night 0001 lux
Luminous Intensity Automobile headlight 5000ndash20000 cd Household flashlight 100ndash1000 cd 100-W tungsten lightbulb 100 cd LED traffic signal 250ndash700 cd Single LED 1 mcdndash25 cd
Radiance and Luminance Sun 2 x 107 Wm2middotsr
(250-2500nm) Sun 2 x 109 nit Frosted lightbulb 100000 nit Fluorescent lamp 5000 nit Computer screen 100 nit
Illumination
Solid Angle
2
The definition of intensity involves the concept of a solid angle A solid angle is a 3D angular volume that is defined analogously to the definition of a plane angle in two dimensions A plane angle θ made up of the lines from two points meeting at a vertex is defined by the arc length of a circle subtended by the lines and by the radius of that circle as shown below The dimensionless unit of plane angle is the radian with 2π radians in a full circle A solid angle ω made up of all the lines from a closed curve meeting at a vertex is defined by the surface area of a sphere subtended by the lines and by the radius of that sphere as shown below The dimensionless unit of solid angle is the steradian with 4π steradians in a full sphere
ω
area a on surface of sphere
ω=ar2 (steradians) 4π steradians in a full sphere
ω
Closed curve
r
θ =lr (radians)
2π radians in
a full circle
θr
l B
O
A B
O
θ
A
Basic Quantities in Illumination
Intensity Radiance and Projected Solid Angle
3
Intensity I is the flux per unit solid angle It is the amount of flux from a point source contained in a small angular volume A source can be considered a point source for this application if the irradiance falls off as the inverse square of the distance from the source Intensity for a given source can vary with direction Radiance L applies to extended sources and surfaces It is the flux per unit solid angle per unit projected area of the source or surface The projected area is the projection of the area onto a surface normal to the direction of view and is equal to the actual area times the cosine of the angle between the surface normal and the direction of view Radiance can vary with position on a surface and like intensity it can vary with direction A source or surface with constant radiance in all directions is called Lambertian A Lambertian source or surface has intensity that varies with the cosine of the angle with the surface normal In many cases the angle of view changes over the extent of the receiver These cases require an alternate definition of radiance radiance is the flux per unit area per unit projected solid angle (In fact this is the more general definition and covers the simpler case where the entire surface of the extended source is at essentially the same angle as the direction of view)
The term ldquointensityrdquo is used in many disciplines some even closely related to optics to mean things other than flux per unit solid angle Use caution and rely on context to determine the meaning of the word in a particular situation
Illumination
Solid Angle and Projected Solid Angle
4
The relationship between solid angle and projected solid angle can be confusing Projected solid angle has meaning primarily for a small Lambertian source which has intensity that varies as the cosine of the angle with the surface normal The projected solid angle Ω is the solid angle ω weighted by the cosine of the angle with the surface normal
When the solid angle is large enough so that the angle with the surface normal is not the same over the entire solid angle the total projected solid angle must be computed by integrating the incremental projected solid angles See the reference by Bartell for a more detailed explanation For some special cases the integration results in simple expressions such as for a large circular cone that is normal to a surface and subtends a half angle θ
θ
Ω = π sin2 θ
A hemisphere has 2π steradians (solid angle) but π projected steradians (projected solid angle)
ω
ϕ Ω = ω cos ϕ
Basic Quantities in Illumination
Spectroradiometric and Radiometric Quantities
5
In the spectral dimension of illumination the most general view looks at the spectral densitymdashthe amount of radiation per unit wavelength interval In terms of the four spatial quantities already considered the spectral quantities are spectral flux Φλ spectral irradiance Eλ spectral intensity Iλ and spectral radiance Lλ These quantities usually written with a subscript to indicate that they are integrable must be integrated to determine the amount of radiation in a particular spectral band For example the total radiant flux Φ (in units of watts) in the band between wavelength λ1 and wavelength λ2 is
2
1
( 1 2) ( ) dλ
λλ
Φ λ λ = Φ λ sdot λint
Similar expressions can be written for the total irradiance E (wattsm2) total radiant intensity I (watts sr) and total radiance L (wattsm2sr) Photometry measures the response of the human eye to light Although not everyone has exactly the same response the standardized CIE 1924 luminous efficiency function works very well for most people (The CIE is the International Commission on Illumination) This function shown on the following page is designated V(λ) The values for this function in 5-nm increments are given in the Appendix Not coincidentally this function is identical to the CIE color matching function y The unit of luminous (photopic) flux is the lumen The luminous flux is found from the spectral flux and the V(λ) function from the following relationship
luminous flux 683 ( ) ( ) V dλ= Φ λ sdot λ sdot λint The factor of 683 in this equation comes directly from the definition of the fundamental unit of luminous intensity the candela
6 Illumination
Photometric Quantities
CIE 1924 Luminous Efficiency
(Vλ)
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
Notes on notation
bull The photopic quantities of flux irradiance intensity and radiance are called luminous flux illuminance luminous intensity and luminance respectively
bull These quantities are sometimes notated with a subscript ldquovrdquo (for visual) as Φv Ev Iv and Lv But often the subscript is omitted since the meaning is usually clear from the context and it could be confused with the subscript notation often reserved for integrable quantities
bull The designations Φ E I and L are common but not universally standard Another set of symbols sometimes used is P H J and N respectively for radiometric quantities Pλ H λ J λ and N λ for spectral quantities and F E I and B for the corresponding photometric quantities
bull Solid angle and projected solid angle are not always distinguished by ω and Ω respectively
Basic Quantities in Illumination
Matrix of Basic Quantities
7
The table above shows the four spatial quantities and the three spectral categories that are discussed in the preceding pages These create 12 distinct cells that cover the vast majority of specifications for illumination systems
With two exceptions both used mainly in the United States work in illumination is almost always done in SI units The two exceptions (both deprecated) are
Illuminance 1 footcandle (lmft2) = 10764 lux (lmm2)
Luminance 1 footlambert (candelaπft2) = 3426 nit (candelam2)
SPECTRAL Radio-
metric Spectral Photopic
Flux
Power
Watts (W)
Power wavelength
interval
Wattsnm
Luminous flux
Lumens (lm)
Flux area
Irradiance
Wm2
Spectral irradiance
Wm2middotnm
Illuminance
lmm2
or lux
Flux solid angle
(Radiant) intensity
Wsr
Spectral intensity
Wsrmiddotnm
(Luminous) intensity
lmsr or
candela (cd)
S P A T I A L
Flux areamiddot solid angle
Radiance
Wm2middotsr
Spectral radiance
Wm2middotsrmiddotnm
Luminance
lmm2middotsr or
cdm2 or nit
8 Illumination
Photopic and Scotopic Vision
The human visual system responds to light over a wide dynamic range in excess of 6 orders of magnitude To achieve this dynamic range the mechanisms for high-light-level vision and low-light-level vision are different The high-level region called the photopic region is active at luminance levels above about 3 cdm2 The low-level region called the scotopic region is active below approximately 001 cdm2 The region between pure photopic and pure scotopic is called the mesopic region where the visual response is a mixture of the two The photopic efficiency usually designated V(λ) peaks at 555 nm while the scotopic efficiency usually designated Vprime(λ) peaks at 507 nm
Scotopic and PhotopicLuminous Efficiency
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
The values for photopic efficiency and scotopic efficiency both in 5-nm increments are given in the Appendix
Basic Quantities in Illumination
Luminous Efficacy
9
Luminous efficacy quantified in lumens per watt is a measure of the ability of a light source to produce a visual response from its power In the photopic region luminous efficacy peaks at 683 lumens per watt at 555 nm In fact the lumen is defined in terms of the power at 555 nm (frequency of 540 times 1012 Hz) Specifically the definition (adopted in 1979) is in terms of the candela (lumen per steradian)
0
100
200 300
400 500
600 700
350 400 450 500 550 600 650 700 750 800 wavelength (nm)
Lum
inou
s Ef
ficac
y (lm
W)
Luminous Efficacy(photopic)
It is usually clear from the context whether the power is the radiated power (as in the discussion above) or often for lamps the ldquowall-plugrdquo power
The candela is the luminous intensity in a given direction of a source that emits monochromatic radiation at a frequency of 540 times 1012 Hz and that has a radiant intensity in that direction of 1683 Watt per steradian
10 Illumination
Typical Values of Illumination Quantities
Wavelength Ranges for Illumination
UV-C 250 to 280 nm UV-B 280 to 315 nm UV-A 315 to 400 nm Visible ~360ndash400 to ~760ndash800 nm Near-infrared (NIR)dagger 760 nm to 11 microm Actual definition of UV-C is 100 to 280 nm However the
range from 100 to 250 nm is not of interest for illumination systems
dagger Actual definition of NIR is to 14 microm However 11 microm is the upper limit for silicon-based detectors
Irradiance and Illuminance Direct sunlight 1000 Wm2 (250-
2500nm) Direct sunlight 100000 lux Shade 10000 lux Overcast day 1000 lux Office space 300ndash600 lux Full moon 02 lux Quarter moon 001 lux Moonless clear night 0001 lux
Luminous Intensity Automobile headlight 5000ndash20000 cd Household flashlight 100ndash1000 cd 100-W tungsten lightbulb 100 cd LED traffic signal 250ndash700 cd Single LED 1 mcdndash25 cd
Radiance and Luminance Sun 2 x 107 Wm2middotsr
(250-2500nm) Sun 2 x 109 nit Frosted lightbulb 100000 nit Fluorescent lamp 5000 nit Computer screen 100 nit
Basic Quantities in Illumination
Intensity Radiance and Projected Solid Angle
3
Intensity I is the flux per unit solid angle It is the amount of flux from a point source contained in a small angular volume A source can be considered a point source for this application if the irradiance falls off as the inverse square of the distance from the source Intensity for a given source can vary with direction Radiance L applies to extended sources and surfaces It is the flux per unit solid angle per unit projected area of the source or surface The projected area is the projection of the area onto a surface normal to the direction of view and is equal to the actual area times the cosine of the angle between the surface normal and the direction of view Radiance can vary with position on a surface and like intensity it can vary with direction A source or surface with constant radiance in all directions is called Lambertian A Lambertian source or surface has intensity that varies with the cosine of the angle with the surface normal In many cases the angle of view changes over the extent of the receiver These cases require an alternate definition of radiance radiance is the flux per unit area per unit projected solid angle (In fact this is the more general definition and covers the simpler case where the entire surface of the extended source is at essentially the same angle as the direction of view)
The term ldquointensityrdquo is used in many disciplines some even closely related to optics to mean things other than flux per unit solid angle Use caution and rely on context to determine the meaning of the word in a particular situation
Illumination
Solid Angle and Projected Solid Angle
4
The relationship between solid angle and projected solid angle can be confusing Projected solid angle has meaning primarily for a small Lambertian source which has intensity that varies as the cosine of the angle with the surface normal The projected solid angle Ω is the solid angle ω weighted by the cosine of the angle with the surface normal
When the solid angle is large enough so that the angle with the surface normal is not the same over the entire solid angle the total projected solid angle must be computed by integrating the incremental projected solid angles See the reference by Bartell for a more detailed explanation For some special cases the integration results in simple expressions such as for a large circular cone that is normal to a surface and subtends a half angle θ
θ
Ω = π sin2 θ
A hemisphere has 2π steradians (solid angle) but π projected steradians (projected solid angle)
ω
ϕ Ω = ω cos ϕ
Basic Quantities in Illumination
Spectroradiometric and Radiometric Quantities
5
In the spectral dimension of illumination the most general view looks at the spectral densitymdashthe amount of radiation per unit wavelength interval In terms of the four spatial quantities already considered the spectral quantities are spectral flux Φλ spectral irradiance Eλ spectral intensity Iλ and spectral radiance Lλ These quantities usually written with a subscript to indicate that they are integrable must be integrated to determine the amount of radiation in a particular spectral band For example the total radiant flux Φ (in units of watts) in the band between wavelength λ1 and wavelength λ2 is
2
1
( 1 2) ( ) dλ
λλ
Φ λ λ = Φ λ sdot λint
Similar expressions can be written for the total irradiance E (wattsm2) total radiant intensity I (watts sr) and total radiance L (wattsm2sr) Photometry measures the response of the human eye to light Although not everyone has exactly the same response the standardized CIE 1924 luminous efficiency function works very well for most people (The CIE is the International Commission on Illumination) This function shown on the following page is designated V(λ) The values for this function in 5-nm increments are given in the Appendix Not coincidentally this function is identical to the CIE color matching function y The unit of luminous (photopic) flux is the lumen The luminous flux is found from the spectral flux and the V(λ) function from the following relationship
luminous flux 683 ( ) ( ) V dλ= Φ λ sdot λ sdot λint The factor of 683 in this equation comes directly from the definition of the fundamental unit of luminous intensity the candela
6 Illumination
Photometric Quantities
CIE 1924 Luminous Efficiency
(Vλ)
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
Notes on notation
bull The photopic quantities of flux irradiance intensity and radiance are called luminous flux illuminance luminous intensity and luminance respectively
bull These quantities are sometimes notated with a subscript ldquovrdquo (for visual) as Φv Ev Iv and Lv But often the subscript is omitted since the meaning is usually clear from the context and it could be confused with the subscript notation often reserved for integrable quantities
bull The designations Φ E I and L are common but not universally standard Another set of symbols sometimes used is P H J and N respectively for radiometric quantities Pλ H λ J λ and N λ for spectral quantities and F E I and B for the corresponding photometric quantities
bull Solid angle and projected solid angle are not always distinguished by ω and Ω respectively
Basic Quantities in Illumination
Matrix of Basic Quantities
7
The table above shows the four spatial quantities and the three spectral categories that are discussed in the preceding pages These create 12 distinct cells that cover the vast majority of specifications for illumination systems
With two exceptions both used mainly in the United States work in illumination is almost always done in SI units The two exceptions (both deprecated) are
Illuminance 1 footcandle (lmft2) = 10764 lux (lmm2)
Luminance 1 footlambert (candelaπft2) = 3426 nit (candelam2)
SPECTRAL Radio-
metric Spectral Photopic
Flux
Power
Watts (W)
Power wavelength
interval
Wattsnm
Luminous flux
Lumens (lm)
Flux area
Irradiance
Wm2
Spectral irradiance
Wm2middotnm
Illuminance
lmm2
or lux
Flux solid angle
(Radiant) intensity
Wsr
Spectral intensity
Wsrmiddotnm
(Luminous) intensity
lmsr or
candela (cd)
S P A T I A L
Flux areamiddot solid angle
Radiance
Wm2middotsr
Spectral radiance
Wm2middotsrmiddotnm
Luminance
lmm2middotsr or
cdm2 or nit
8 Illumination
Photopic and Scotopic Vision
The human visual system responds to light over a wide dynamic range in excess of 6 orders of magnitude To achieve this dynamic range the mechanisms for high-light-level vision and low-light-level vision are different The high-level region called the photopic region is active at luminance levels above about 3 cdm2 The low-level region called the scotopic region is active below approximately 001 cdm2 The region between pure photopic and pure scotopic is called the mesopic region where the visual response is a mixture of the two The photopic efficiency usually designated V(λ) peaks at 555 nm while the scotopic efficiency usually designated Vprime(λ) peaks at 507 nm
Scotopic and PhotopicLuminous Efficiency
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
The values for photopic efficiency and scotopic efficiency both in 5-nm increments are given in the Appendix
Basic Quantities in Illumination
Luminous Efficacy
9
Luminous efficacy quantified in lumens per watt is a measure of the ability of a light source to produce a visual response from its power In the photopic region luminous efficacy peaks at 683 lumens per watt at 555 nm In fact the lumen is defined in terms of the power at 555 nm (frequency of 540 times 1012 Hz) Specifically the definition (adopted in 1979) is in terms of the candela (lumen per steradian)
0
100
200 300
400 500
600 700
350 400 450 500 550 600 650 700 750 800 wavelength (nm)
Lum
inou
s Ef
ficac
y (lm
W)
Luminous Efficacy(photopic)
It is usually clear from the context whether the power is the radiated power (as in the discussion above) or often for lamps the ldquowall-plugrdquo power
The candela is the luminous intensity in a given direction of a source that emits monochromatic radiation at a frequency of 540 times 1012 Hz and that has a radiant intensity in that direction of 1683 Watt per steradian
10 Illumination
Typical Values of Illumination Quantities
Wavelength Ranges for Illumination
UV-C 250 to 280 nm UV-B 280 to 315 nm UV-A 315 to 400 nm Visible ~360ndash400 to ~760ndash800 nm Near-infrared (NIR)dagger 760 nm to 11 microm Actual definition of UV-C is 100 to 280 nm However the
range from 100 to 250 nm is not of interest for illumination systems
dagger Actual definition of NIR is to 14 microm However 11 microm is the upper limit for silicon-based detectors
Irradiance and Illuminance Direct sunlight 1000 Wm2 (250-
2500nm) Direct sunlight 100000 lux Shade 10000 lux Overcast day 1000 lux Office space 300ndash600 lux Full moon 02 lux Quarter moon 001 lux Moonless clear night 0001 lux
Luminous Intensity Automobile headlight 5000ndash20000 cd Household flashlight 100ndash1000 cd 100-W tungsten lightbulb 100 cd LED traffic signal 250ndash700 cd Single LED 1 mcdndash25 cd
Radiance and Luminance Sun 2 x 107 Wm2middotsr
(250-2500nm) Sun 2 x 109 nit Frosted lightbulb 100000 nit Fluorescent lamp 5000 nit Computer screen 100 nit
Illumination
Solid Angle and Projected Solid Angle
4
The relationship between solid angle and projected solid angle can be confusing Projected solid angle has meaning primarily for a small Lambertian source which has intensity that varies as the cosine of the angle with the surface normal The projected solid angle Ω is the solid angle ω weighted by the cosine of the angle with the surface normal
When the solid angle is large enough so that the angle with the surface normal is not the same over the entire solid angle the total projected solid angle must be computed by integrating the incremental projected solid angles See the reference by Bartell for a more detailed explanation For some special cases the integration results in simple expressions such as for a large circular cone that is normal to a surface and subtends a half angle θ
θ
Ω = π sin2 θ
A hemisphere has 2π steradians (solid angle) but π projected steradians (projected solid angle)
ω
ϕ Ω = ω cos ϕ
Basic Quantities in Illumination
Spectroradiometric and Radiometric Quantities
5
In the spectral dimension of illumination the most general view looks at the spectral densitymdashthe amount of radiation per unit wavelength interval In terms of the four spatial quantities already considered the spectral quantities are spectral flux Φλ spectral irradiance Eλ spectral intensity Iλ and spectral radiance Lλ These quantities usually written with a subscript to indicate that they are integrable must be integrated to determine the amount of radiation in a particular spectral band For example the total radiant flux Φ (in units of watts) in the band between wavelength λ1 and wavelength λ2 is
2
1
( 1 2) ( ) dλ
λλ
Φ λ λ = Φ λ sdot λint
Similar expressions can be written for the total irradiance E (wattsm2) total radiant intensity I (watts sr) and total radiance L (wattsm2sr) Photometry measures the response of the human eye to light Although not everyone has exactly the same response the standardized CIE 1924 luminous efficiency function works very well for most people (The CIE is the International Commission on Illumination) This function shown on the following page is designated V(λ) The values for this function in 5-nm increments are given in the Appendix Not coincidentally this function is identical to the CIE color matching function y The unit of luminous (photopic) flux is the lumen The luminous flux is found from the spectral flux and the V(λ) function from the following relationship
luminous flux 683 ( ) ( ) V dλ= Φ λ sdot λ sdot λint The factor of 683 in this equation comes directly from the definition of the fundamental unit of luminous intensity the candela
6 Illumination
Photometric Quantities
CIE 1924 Luminous Efficiency
(Vλ)
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
Notes on notation
bull The photopic quantities of flux irradiance intensity and radiance are called luminous flux illuminance luminous intensity and luminance respectively
bull These quantities are sometimes notated with a subscript ldquovrdquo (for visual) as Φv Ev Iv and Lv But often the subscript is omitted since the meaning is usually clear from the context and it could be confused with the subscript notation often reserved for integrable quantities
bull The designations Φ E I and L are common but not universally standard Another set of symbols sometimes used is P H J and N respectively for radiometric quantities Pλ H λ J λ and N λ for spectral quantities and F E I and B for the corresponding photometric quantities
bull Solid angle and projected solid angle are not always distinguished by ω and Ω respectively
Basic Quantities in Illumination
Matrix of Basic Quantities
7
The table above shows the four spatial quantities and the three spectral categories that are discussed in the preceding pages These create 12 distinct cells that cover the vast majority of specifications for illumination systems
With two exceptions both used mainly in the United States work in illumination is almost always done in SI units The two exceptions (both deprecated) are
Illuminance 1 footcandle (lmft2) = 10764 lux (lmm2)
Luminance 1 footlambert (candelaπft2) = 3426 nit (candelam2)
SPECTRAL Radio-
metric Spectral Photopic
Flux
Power
Watts (W)
Power wavelength
interval
Wattsnm
Luminous flux
Lumens (lm)
Flux area
Irradiance
Wm2
Spectral irradiance
Wm2middotnm
Illuminance
lmm2
or lux
Flux solid angle
(Radiant) intensity
Wsr
Spectral intensity
Wsrmiddotnm
(Luminous) intensity
lmsr or
candela (cd)
S P A T I A L
Flux areamiddot solid angle
Radiance
Wm2middotsr
Spectral radiance
Wm2middotsrmiddotnm
Luminance
lmm2middotsr or
cdm2 or nit
8 Illumination
Photopic and Scotopic Vision
The human visual system responds to light over a wide dynamic range in excess of 6 orders of magnitude To achieve this dynamic range the mechanisms for high-light-level vision and low-light-level vision are different The high-level region called the photopic region is active at luminance levels above about 3 cdm2 The low-level region called the scotopic region is active below approximately 001 cdm2 The region between pure photopic and pure scotopic is called the mesopic region where the visual response is a mixture of the two The photopic efficiency usually designated V(λ) peaks at 555 nm while the scotopic efficiency usually designated Vprime(λ) peaks at 507 nm
Scotopic and PhotopicLuminous Efficiency
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
The values for photopic efficiency and scotopic efficiency both in 5-nm increments are given in the Appendix
Basic Quantities in Illumination
Luminous Efficacy
9
Luminous efficacy quantified in lumens per watt is a measure of the ability of a light source to produce a visual response from its power In the photopic region luminous efficacy peaks at 683 lumens per watt at 555 nm In fact the lumen is defined in terms of the power at 555 nm (frequency of 540 times 1012 Hz) Specifically the definition (adopted in 1979) is in terms of the candela (lumen per steradian)
0
100
200 300
400 500
600 700
350 400 450 500 550 600 650 700 750 800 wavelength (nm)
Lum
inou
s Ef
ficac
y (lm
W)
Luminous Efficacy(photopic)
It is usually clear from the context whether the power is the radiated power (as in the discussion above) or often for lamps the ldquowall-plugrdquo power
The candela is the luminous intensity in a given direction of a source that emits monochromatic radiation at a frequency of 540 times 1012 Hz and that has a radiant intensity in that direction of 1683 Watt per steradian
10 Illumination
Typical Values of Illumination Quantities
Wavelength Ranges for Illumination
UV-C 250 to 280 nm UV-B 280 to 315 nm UV-A 315 to 400 nm Visible ~360ndash400 to ~760ndash800 nm Near-infrared (NIR)dagger 760 nm to 11 microm Actual definition of UV-C is 100 to 280 nm However the
range from 100 to 250 nm is not of interest for illumination systems
dagger Actual definition of NIR is to 14 microm However 11 microm is the upper limit for silicon-based detectors
Irradiance and Illuminance Direct sunlight 1000 Wm2 (250-
2500nm) Direct sunlight 100000 lux Shade 10000 lux Overcast day 1000 lux Office space 300ndash600 lux Full moon 02 lux Quarter moon 001 lux Moonless clear night 0001 lux
Luminous Intensity Automobile headlight 5000ndash20000 cd Household flashlight 100ndash1000 cd 100-W tungsten lightbulb 100 cd LED traffic signal 250ndash700 cd Single LED 1 mcdndash25 cd
Radiance and Luminance Sun 2 x 107 Wm2middotsr
(250-2500nm) Sun 2 x 109 nit Frosted lightbulb 100000 nit Fluorescent lamp 5000 nit Computer screen 100 nit
Basic Quantities in Illumination
Spectroradiometric and Radiometric Quantities
5
In the spectral dimension of illumination the most general view looks at the spectral densitymdashthe amount of radiation per unit wavelength interval In terms of the four spatial quantities already considered the spectral quantities are spectral flux Φλ spectral irradiance Eλ spectral intensity Iλ and spectral radiance Lλ These quantities usually written with a subscript to indicate that they are integrable must be integrated to determine the amount of radiation in a particular spectral band For example the total radiant flux Φ (in units of watts) in the band between wavelength λ1 and wavelength λ2 is
2
1
( 1 2) ( ) dλ
λλ
Φ λ λ = Φ λ sdot λint
Similar expressions can be written for the total irradiance E (wattsm2) total radiant intensity I (watts sr) and total radiance L (wattsm2sr) Photometry measures the response of the human eye to light Although not everyone has exactly the same response the standardized CIE 1924 luminous efficiency function works very well for most people (The CIE is the International Commission on Illumination) This function shown on the following page is designated V(λ) The values for this function in 5-nm increments are given in the Appendix Not coincidentally this function is identical to the CIE color matching function y The unit of luminous (photopic) flux is the lumen The luminous flux is found from the spectral flux and the V(λ) function from the following relationship
luminous flux 683 ( ) ( ) V dλ= Φ λ sdot λ sdot λint The factor of 683 in this equation comes directly from the definition of the fundamental unit of luminous intensity the candela
6 Illumination
Photometric Quantities
CIE 1924 Luminous Efficiency
(Vλ)
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
Notes on notation
bull The photopic quantities of flux irradiance intensity and radiance are called luminous flux illuminance luminous intensity and luminance respectively
bull These quantities are sometimes notated with a subscript ldquovrdquo (for visual) as Φv Ev Iv and Lv But often the subscript is omitted since the meaning is usually clear from the context and it could be confused with the subscript notation often reserved for integrable quantities
bull The designations Φ E I and L are common but not universally standard Another set of symbols sometimes used is P H J and N respectively for radiometric quantities Pλ H λ J λ and N λ for spectral quantities and F E I and B for the corresponding photometric quantities
bull Solid angle and projected solid angle are not always distinguished by ω and Ω respectively
Basic Quantities in Illumination
Matrix of Basic Quantities
7
The table above shows the four spatial quantities and the three spectral categories that are discussed in the preceding pages These create 12 distinct cells that cover the vast majority of specifications for illumination systems
With two exceptions both used mainly in the United States work in illumination is almost always done in SI units The two exceptions (both deprecated) are
Illuminance 1 footcandle (lmft2) = 10764 lux (lmm2)
Luminance 1 footlambert (candelaπft2) = 3426 nit (candelam2)
SPECTRAL Radio-
metric Spectral Photopic
Flux
Power
Watts (W)
Power wavelength
interval
Wattsnm
Luminous flux
Lumens (lm)
Flux area
Irradiance
Wm2
Spectral irradiance
Wm2middotnm
Illuminance
lmm2
or lux
Flux solid angle
(Radiant) intensity
Wsr
Spectral intensity
Wsrmiddotnm
(Luminous) intensity
lmsr or
candela (cd)
S P A T I A L
Flux areamiddot solid angle
Radiance
Wm2middotsr
Spectral radiance
Wm2middotsrmiddotnm
Luminance
lmm2middotsr or
cdm2 or nit
8 Illumination
Photopic and Scotopic Vision
The human visual system responds to light over a wide dynamic range in excess of 6 orders of magnitude To achieve this dynamic range the mechanisms for high-light-level vision and low-light-level vision are different The high-level region called the photopic region is active at luminance levels above about 3 cdm2 The low-level region called the scotopic region is active below approximately 001 cdm2 The region between pure photopic and pure scotopic is called the mesopic region where the visual response is a mixture of the two The photopic efficiency usually designated V(λ) peaks at 555 nm while the scotopic efficiency usually designated Vprime(λ) peaks at 507 nm
Scotopic and PhotopicLuminous Efficiency
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
The values for photopic efficiency and scotopic efficiency both in 5-nm increments are given in the Appendix
Basic Quantities in Illumination
Luminous Efficacy
9
Luminous efficacy quantified in lumens per watt is a measure of the ability of a light source to produce a visual response from its power In the photopic region luminous efficacy peaks at 683 lumens per watt at 555 nm In fact the lumen is defined in terms of the power at 555 nm (frequency of 540 times 1012 Hz) Specifically the definition (adopted in 1979) is in terms of the candela (lumen per steradian)
0
100
200 300
400 500
600 700
350 400 450 500 550 600 650 700 750 800 wavelength (nm)
Lum
inou
s Ef
ficac
y (lm
W)
Luminous Efficacy(photopic)
It is usually clear from the context whether the power is the radiated power (as in the discussion above) or often for lamps the ldquowall-plugrdquo power
The candela is the luminous intensity in a given direction of a source that emits monochromatic radiation at a frequency of 540 times 1012 Hz and that has a radiant intensity in that direction of 1683 Watt per steradian
10 Illumination
Typical Values of Illumination Quantities
Wavelength Ranges for Illumination
UV-C 250 to 280 nm UV-B 280 to 315 nm UV-A 315 to 400 nm Visible ~360ndash400 to ~760ndash800 nm Near-infrared (NIR)dagger 760 nm to 11 microm Actual definition of UV-C is 100 to 280 nm However the
range from 100 to 250 nm is not of interest for illumination systems
dagger Actual definition of NIR is to 14 microm However 11 microm is the upper limit for silicon-based detectors
Irradiance and Illuminance Direct sunlight 1000 Wm2 (250-
2500nm) Direct sunlight 100000 lux Shade 10000 lux Overcast day 1000 lux Office space 300ndash600 lux Full moon 02 lux Quarter moon 001 lux Moonless clear night 0001 lux
Luminous Intensity Automobile headlight 5000ndash20000 cd Household flashlight 100ndash1000 cd 100-W tungsten lightbulb 100 cd LED traffic signal 250ndash700 cd Single LED 1 mcdndash25 cd
Radiance and Luminance Sun 2 x 107 Wm2middotsr
(250-2500nm) Sun 2 x 109 nit Frosted lightbulb 100000 nit Fluorescent lamp 5000 nit Computer screen 100 nit
6 Illumination
Photometric Quantities
CIE 1924 Luminous Efficiency
(Vλ)
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
Notes on notation
bull The photopic quantities of flux irradiance intensity and radiance are called luminous flux illuminance luminous intensity and luminance respectively
bull These quantities are sometimes notated with a subscript ldquovrdquo (for visual) as Φv Ev Iv and Lv But often the subscript is omitted since the meaning is usually clear from the context and it could be confused with the subscript notation often reserved for integrable quantities
bull The designations Φ E I and L are common but not universally standard Another set of symbols sometimes used is P H J and N respectively for radiometric quantities Pλ H λ J λ and N λ for spectral quantities and F E I and B for the corresponding photometric quantities
bull Solid angle and projected solid angle are not always distinguished by ω and Ω respectively
Basic Quantities in Illumination
Matrix of Basic Quantities
7
The table above shows the four spatial quantities and the three spectral categories that are discussed in the preceding pages These create 12 distinct cells that cover the vast majority of specifications for illumination systems
With two exceptions both used mainly in the United States work in illumination is almost always done in SI units The two exceptions (both deprecated) are
Illuminance 1 footcandle (lmft2) = 10764 lux (lmm2)
Luminance 1 footlambert (candelaπft2) = 3426 nit (candelam2)
SPECTRAL Radio-
metric Spectral Photopic
Flux
Power
Watts (W)
Power wavelength
interval
Wattsnm
Luminous flux
Lumens (lm)
Flux area
Irradiance
Wm2
Spectral irradiance
Wm2middotnm
Illuminance
lmm2
or lux
Flux solid angle
(Radiant) intensity
Wsr
Spectral intensity
Wsrmiddotnm
(Luminous) intensity
lmsr or
candela (cd)
S P A T I A L
Flux areamiddot solid angle
Radiance
Wm2middotsr
Spectral radiance
Wm2middotsrmiddotnm
Luminance
lmm2middotsr or
cdm2 or nit
8 Illumination
Photopic and Scotopic Vision
The human visual system responds to light over a wide dynamic range in excess of 6 orders of magnitude To achieve this dynamic range the mechanisms for high-light-level vision and low-light-level vision are different The high-level region called the photopic region is active at luminance levels above about 3 cdm2 The low-level region called the scotopic region is active below approximately 001 cdm2 The region between pure photopic and pure scotopic is called the mesopic region where the visual response is a mixture of the two The photopic efficiency usually designated V(λ) peaks at 555 nm while the scotopic efficiency usually designated Vprime(λ) peaks at 507 nm
Scotopic and PhotopicLuminous Efficiency
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
The values for photopic efficiency and scotopic efficiency both in 5-nm increments are given in the Appendix
Basic Quantities in Illumination
Luminous Efficacy
9
Luminous efficacy quantified in lumens per watt is a measure of the ability of a light source to produce a visual response from its power In the photopic region luminous efficacy peaks at 683 lumens per watt at 555 nm In fact the lumen is defined in terms of the power at 555 nm (frequency of 540 times 1012 Hz) Specifically the definition (adopted in 1979) is in terms of the candela (lumen per steradian)
0
100
200 300
400 500
600 700
350 400 450 500 550 600 650 700 750 800 wavelength (nm)
Lum
inou
s Ef
ficac
y (lm
W)
Luminous Efficacy(photopic)
It is usually clear from the context whether the power is the radiated power (as in the discussion above) or often for lamps the ldquowall-plugrdquo power
The candela is the luminous intensity in a given direction of a source that emits monochromatic radiation at a frequency of 540 times 1012 Hz and that has a radiant intensity in that direction of 1683 Watt per steradian
10 Illumination
Typical Values of Illumination Quantities
Wavelength Ranges for Illumination
UV-C 250 to 280 nm UV-B 280 to 315 nm UV-A 315 to 400 nm Visible ~360ndash400 to ~760ndash800 nm Near-infrared (NIR)dagger 760 nm to 11 microm Actual definition of UV-C is 100 to 280 nm However the
range from 100 to 250 nm is not of interest for illumination systems
dagger Actual definition of NIR is to 14 microm However 11 microm is the upper limit for silicon-based detectors
Irradiance and Illuminance Direct sunlight 1000 Wm2 (250-
2500nm) Direct sunlight 100000 lux Shade 10000 lux Overcast day 1000 lux Office space 300ndash600 lux Full moon 02 lux Quarter moon 001 lux Moonless clear night 0001 lux
Luminous Intensity Automobile headlight 5000ndash20000 cd Household flashlight 100ndash1000 cd 100-W tungsten lightbulb 100 cd LED traffic signal 250ndash700 cd Single LED 1 mcdndash25 cd
Radiance and Luminance Sun 2 x 107 Wm2middotsr
(250-2500nm) Sun 2 x 109 nit Frosted lightbulb 100000 nit Fluorescent lamp 5000 nit Computer screen 100 nit
Basic Quantities in Illumination
Matrix of Basic Quantities
7
The table above shows the four spatial quantities and the three spectral categories that are discussed in the preceding pages These create 12 distinct cells that cover the vast majority of specifications for illumination systems
With two exceptions both used mainly in the United States work in illumination is almost always done in SI units The two exceptions (both deprecated) are
Illuminance 1 footcandle (lmft2) = 10764 lux (lmm2)
Luminance 1 footlambert (candelaπft2) = 3426 nit (candelam2)
SPECTRAL Radio-
metric Spectral Photopic
Flux
Power
Watts (W)
Power wavelength
interval
Wattsnm
Luminous flux
Lumens (lm)
Flux area
Irradiance
Wm2
Spectral irradiance
Wm2middotnm
Illuminance
lmm2
or lux
Flux solid angle
(Radiant) intensity
Wsr
Spectral intensity
Wsrmiddotnm
(Luminous) intensity
lmsr or
candela (cd)
S P A T I A L
Flux areamiddot solid angle
Radiance
Wm2middotsr
Spectral radiance
Wm2middotsrmiddotnm
Luminance
lmm2middotsr or
cdm2 or nit
8 Illumination
Photopic and Scotopic Vision
The human visual system responds to light over a wide dynamic range in excess of 6 orders of magnitude To achieve this dynamic range the mechanisms for high-light-level vision and low-light-level vision are different The high-level region called the photopic region is active at luminance levels above about 3 cdm2 The low-level region called the scotopic region is active below approximately 001 cdm2 The region between pure photopic and pure scotopic is called the mesopic region where the visual response is a mixture of the two The photopic efficiency usually designated V(λ) peaks at 555 nm while the scotopic efficiency usually designated Vprime(λ) peaks at 507 nm
Scotopic and PhotopicLuminous Efficiency
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
The values for photopic efficiency and scotopic efficiency both in 5-nm increments are given in the Appendix
Basic Quantities in Illumination
Luminous Efficacy
9
Luminous efficacy quantified in lumens per watt is a measure of the ability of a light source to produce a visual response from its power In the photopic region luminous efficacy peaks at 683 lumens per watt at 555 nm In fact the lumen is defined in terms of the power at 555 nm (frequency of 540 times 1012 Hz) Specifically the definition (adopted in 1979) is in terms of the candela (lumen per steradian)
0
100
200 300
400 500
600 700
350 400 450 500 550 600 650 700 750 800 wavelength (nm)
Lum
inou
s Ef
ficac
y (lm
W)
Luminous Efficacy(photopic)
It is usually clear from the context whether the power is the radiated power (as in the discussion above) or often for lamps the ldquowall-plugrdquo power
The candela is the luminous intensity in a given direction of a source that emits monochromatic radiation at a frequency of 540 times 1012 Hz and that has a radiant intensity in that direction of 1683 Watt per steradian
10 Illumination
Typical Values of Illumination Quantities
Wavelength Ranges for Illumination
UV-C 250 to 280 nm UV-B 280 to 315 nm UV-A 315 to 400 nm Visible ~360ndash400 to ~760ndash800 nm Near-infrared (NIR)dagger 760 nm to 11 microm Actual definition of UV-C is 100 to 280 nm However the
range from 100 to 250 nm is not of interest for illumination systems
dagger Actual definition of NIR is to 14 microm However 11 microm is the upper limit for silicon-based detectors
Irradiance and Illuminance Direct sunlight 1000 Wm2 (250-
2500nm) Direct sunlight 100000 lux Shade 10000 lux Overcast day 1000 lux Office space 300ndash600 lux Full moon 02 lux Quarter moon 001 lux Moonless clear night 0001 lux
Luminous Intensity Automobile headlight 5000ndash20000 cd Household flashlight 100ndash1000 cd 100-W tungsten lightbulb 100 cd LED traffic signal 250ndash700 cd Single LED 1 mcdndash25 cd
Radiance and Luminance Sun 2 x 107 Wm2middotsr
(250-2500nm) Sun 2 x 109 nit Frosted lightbulb 100000 nit Fluorescent lamp 5000 nit Computer screen 100 nit
8 Illumination
Photopic and Scotopic Vision
The human visual system responds to light over a wide dynamic range in excess of 6 orders of magnitude To achieve this dynamic range the mechanisms for high-light-level vision and low-light-level vision are different The high-level region called the photopic region is active at luminance levels above about 3 cdm2 The low-level region called the scotopic region is active below approximately 001 cdm2 The region between pure photopic and pure scotopic is called the mesopic region where the visual response is a mixture of the two The photopic efficiency usually designated V(λ) peaks at 555 nm while the scotopic efficiency usually designated Vprime(λ) peaks at 507 nm
Scotopic and PhotopicLuminous Efficiency
00
02
04
06
08
10
350 400 450 500 550 600 650 700 750 800
wavelength (nm)
Lum
inou
s E
ffici
ency
The values for photopic efficiency and scotopic efficiency both in 5-nm increments are given in the Appendix
Basic Quantities in Illumination
Luminous Efficacy
9
Luminous efficacy quantified in lumens per watt is a measure of the ability of a light source to produce a visual response from its power In the photopic region luminous efficacy peaks at 683 lumens per watt at 555 nm In fact the lumen is defined in terms of the power at 555 nm (frequency of 540 times 1012 Hz) Specifically the definition (adopted in 1979) is in terms of the candela (lumen per steradian)
0
100
200 300
400 500
600 700
350 400 450 500 550 600 650 700 750 800 wavelength (nm)
Lum
inou
s Ef
ficac
y (lm
W)
Luminous Efficacy(photopic)
It is usually clear from the context whether the power is the radiated power (as in the discussion above) or often for lamps the ldquowall-plugrdquo power
The candela is the luminous intensity in a given direction of a source that emits monochromatic radiation at a frequency of 540 times 1012 Hz and that has a radiant intensity in that direction of 1683 Watt per steradian
10 Illumination
Typical Values of Illumination Quantities
Wavelength Ranges for Illumination
UV-C 250 to 280 nm UV-B 280 to 315 nm UV-A 315 to 400 nm Visible ~360ndash400 to ~760ndash800 nm Near-infrared (NIR)dagger 760 nm to 11 microm Actual definition of UV-C is 100 to 280 nm However the
range from 100 to 250 nm is not of interest for illumination systems
dagger Actual definition of NIR is to 14 microm However 11 microm is the upper limit for silicon-based detectors
Irradiance and Illuminance Direct sunlight 1000 Wm2 (250-
2500nm) Direct sunlight 100000 lux Shade 10000 lux Overcast day 1000 lux Office space 300ndash600 lux Full moon 02 lux Quarter moon 001 lux Moonless clear night 0001 lux
Luminous Intensity Automobile headlight 5000ndash20000 cd Household flashlight 100ndash1000 cd 100-W tungsten lightbulb 100 cd LED traffic signal 250ndash700 cd Single LED 1 mcdndash25 cd
Radiance and Luminance Sun 2 x 107 Wm2middotsr
(250-2500nm) Sun 2 x 109 nit Frosted lightbulb 100000 nit Fluorescent lamp 5000 nit Computer screen 100 nit
Basic Quantities in Illumination
Luminous Efficacy
9
Luminous efficacy quantified in lumens per watt is a measure of the ability of a light source to produce a visual response from its power In the photopic region luminous efficacy peaks at 683 lumens per watt at 555 nm In fact the lumen is defined in terms of the power at 555 nm (frequency of 540 times 1012 Hz) Specifically the definition (adopted in 1979) is in terms of the candela (lumen per steradian)
0
100
200 300
400 500
600 700
350 400 450 500 550 600 650 700 750 800 wavelength (nm)
Lum
inou
s Ef
ficac
y (lm
W)
Luminous Efficacy(photopic)
It is usually clear from the context whether the power is the radiated power (as in the discussion above) or often for lamps the ldquowall-plugrdquo power
The candela is the luminous intensity in a given direction of a source that emits monochromatic radiation at a frequency of 540 times 1012 Hz and that has a radiant intensity in that direction of 1683 Watt per steradian
10 Illumination
Typical Values of Illumination Quantities
Wavelength Ranges for Illumination
UV-C 250 to 280 nm UV-B 280 to 315 nm UV-A 315 to 400 nm Visible ~360ndash400 to ~760ndash800 nm Near-infrared (NIR)dagger 760 nm to 11 microm Actual definition of UV-C is 100 to 280 nm However the
range from 100 to 250 nm is not of interest for illumination systems
dagger Actual definition of NIR is to 14 microm However 11 microm is the upper limit for silicon-based detectors
Irradiance and Illuminance Direct sunlight 1000 Wm2 (250-
2500nm) Direct sunlight 100000 lux Shade 10000 lux Overcast day 1000 lux Office space 300ndash600 lux Full moon 02 lux Quarter moon 001 lux Moonless clear night 0001 lux
Luminous Intensity Automobile headlight 5000ndash20000 cd Household flashlight 100ndash1000 cd 100-W tungsten lightbulb 100 cd LED traffic signal 250ndash700 cd Single LED 1 mcdndash25 cd
Radiance and Luminance Sun 2 x 107 Wm2middotsr
(250-2500nm) Sun 2 x 109 nit Frosted lightbulb 100000 nit Fluorescent lamp 5000 nit Computer screen 100 nit
10 Illumination
Typical Values of Illumination Quantities
Wavelength Ranges for Illumination
UV-C 250 to 280 nm UV-B 280 to 315 nm UV-A 315 to 400 nm Visible ~360ndash400 to ~760ndash800 nm Near-infrared (NIR)dagger 760 nm to 11 microm Actual definition of UV-C is 100 to 280 nm However the
range from 100 to 250 nm is not of interest for illumination systems
dagger Actual definition of NIR is to 14 microm However 11 microm is the upper limit for silicon-based detectors
Irradiance and Illuminance Direct sunlight 1000 Wm2 (250-
2500nm) Direct sunlight 100000 lux Shade 10000 lux Overcast day 1000 lux Office space 300ndash600 lux Full moon 02 lux Quarter moon 001 lux Moonless clear night 0001 lux
Luminous Intensity Automobile headlight 5000ndash20000 cd Household flashlight 100ndash1000 cd 100-W tungsten lightbulb 100 cd LED traffic signal 250ndash700 cd Single LED 1 mcdndash25 cd
Radiance and Luminance Sun 2 x 107 Wm2middotsr
(250-2500nm) Sun 2 x 109 nit Frosted lightbulb 100000 nit Fluorescent lamp 5000 nit Computer screen 100 nit